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[QUOTE=MisterBitcoin;477972]Reserving S1005 up to n=25K.[/QUOTE]
I had to stop two of my linux server due to less work. One of them was payed until 03/03/2018 and the other one up to 31/11/2018. It looks like something went wrong and they (the server hoster) deleted the datas from the longer payed server instead of the shorter one. Anyway all results from S1005 were gone. I´m releasing that base. Sieve file is also gone, will make a new one. |
Reserving S576 to n=100k (25-100k) for BOINC
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R936 is complete to n=25K; 106 primes were found for n=10K-25K shown below; 184 k's remain; base released.
[code] 90463*936^10035-1 94764*936^10129-1 73693*936^10260-1 71975*936^10281-1 52237*936^10414-1 90833*936^10437-1 60854*936^10593-1 18400*936^10657-1 51249*936^10678-1 100015*936^10937-1 1527*936^11179-1 82273*936^11315-1 78560*936^11478-1 5505*936^11603-1 2249*936^11625-1 47915*936^11631-1 88454*936^11673-1 2878*936^11674-1 95183*936^11690-1 40175*936^11843-1 98218*936^11873-1 69484*936^11884-1 24228*936^11968-1 54189*936^12103-1 26340*936^12140-1 10727*936^12304-1 69893*936^12528-1 53948*936^12649-1 52050*936^12652-1 38032*936^12675-1 93154*936^12716-1 75309*936^12892-1 12468*936^13036-1 91278*936^13063-1 79087*936^13083-1 8675*936^13198-1 67323*936^13235-1 22938*936^13351-1 18617*936^13518-1 30102*936^13529-1 44989*936^13928-1 30674*936^13963-1 85249*936^14024-1 73755*936^14040-1 97873*936^14336-1 26784*936^14340-1 15419*936^14724-1 25647*936^14874-1 13393*936^14933-1 35917*936^15014-1 45240*936^15196-1 69325*936^15393-1 12784*936^15771-1 10573*936^15832-1 90185*936^16118-1 98323*936^16263-1 52793*936^16604-1 64750*936^16653-1 64535*936^16758-1 81019*936^16828-1 40088*936^16904-1 45784*936^17138-1 25995*936^17388-1 71073*936^17497-1 88702*936^17528-1 33169*936^17792-1 42713*936^17918-1 66849*936^18065-1 64199*936^18229-1 79005*936^18291-1 328*936^18403-1 49074*936^18680-1 72943*936^18857-1 5745*936^18864-1 28184*936^18972-1 75403*936^19075-1 94408*936^19156-1 66959*936^19416-1 82092*936^19518-1 91452*936^19735-1 42645*936^19748-1 90310*936^19767-1 47938*936^19786-1 53624*936^19899-1 62284*936^20019-1 54127*936^20265-1 77578*936^20267-1 69744*936^20681-1 20497*936^21050-1 16894*936^21107-1 11002*936^21410-1 39752*936^21488-1 91779*936^21849-1 9917*936^21903-1 58809*936^21951-1 24649*936^22509-1 69903*936^22679-1 73508*936^22689-1 988*936^22749-1 73104*936^22756-1 54610*936^22943-1 75370*936^23341-1 86283*936^23366-1 12283*936^23768-1 96110*936^23956-1 69632*936^24096-1 [/code] |
Reserving S646 to n=100k (25-100k) for BOINC
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Reserving S1005 to n=25K.
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S810 tested to n=100k (50-100k)
50 primes found, 165 remain Results emailed - Base released |
S576 tested to n=100k (25-100k)
64 primes found, 155 remain Results emailed - Base released |
Reserving R877 to n=25K.
I will turn the work over to Ian. |
R606 is complete to n=25K; 185 primes were found for n=10K-25K shown below; 419 k's remain; base released.
[code] 39544*606^10036-1 2480*606^10050-1 52257*606^10059-1 18243*606^10150-1 7372*606^10253-1 26317*606^10267-1 51727*606^10285-1 41814*606^10318-1 65920*606^10370-1 67417*606^10537-1 14858*606^10729-1 25335*606^10853-1 71982*606^10901-1 72045*606^10993-1 27010*606^11145-1 67287*606^11155-1 33834*606^11162-1 52299*606^11177-1 24779*606^11193-1 61317*606^11236-1 21893*606^11283-1 46593*606^11318-1 69094*606^11332-1 48164*606^11368-1 58270*606^11384-1 36075*606^11457-1 59502*606^11501-1 40522*606^11539-1 39863*606^11616-1 68429*606^11617-1 33553*606^11658-1 18713*606^11766-1 68658*606^11786-1 43233*606^11992-1 66635*606^11994-1 802*606^11998-1 19023*606^12297-1 69142*606^12308-1 20518*606^12334-1 18342*606^12509-1 68874*606^12509-1 43499*606^12571-1 45985*606^12578-1 61702*606^12603-1 54618*606^12676-1 39778*606^12690-1 26723*606^12694-1 12797*606^12700-1 5195*606^12701-1 26905*606^12724-1 30792*606^12761-1 9199*606^12844-1 56858*606^12930-1 29234*606^12951-1 70475*606^13015-1 68489*606^13067-1 38817*606^13104-1 33882*606^13164-1 49713*606^13171-1 38949*606^13183-1 50558*606^13273-1 28543*606^13305-1 18988*606^13318-1 56777*606^13328-1 31035*606^13378-1 53052*606^13469-1 37678*606^13483-1 58410*606^13523-1 32727*606^13563-1 65108*606^13709-1 59613*606^13817-1 49757*606^13829-1 10152*606^13832-1 64849*606^13838-1 23615*606^13839-1 13609*606^13856-1 42105*606^13885-1 35625*606^13898-1 18175*606^13901-1 38467*606^14063-1 4468*606^14103-1 24887*606^14195-1 30704*606^14261-1 10389*606^14267-1 65333*606^14336-1 23880*606^14380-1 34897*606^14414-1 14793*606^14624-1 63890*606^14753-1 8982*606^15059-1 67932*606^15102-1 45245*606^15300-1 28478*606^15393-1 43207*606^15420-1 19898*606^15537-1 45319*606^15563-1 63673*606^15584-1 71219*606^15622-1 6547*606^15626-1 44678*606^15636-1 52133*606^15643-1 61303*606^15892-1 21669*606^15936-1 26364*606^15965-1 18020*606^16047-1 1587*606^16138-1 15250*606^16158-1 73672*606^16203-1 32358*606^16282-1 35569*606^16305-1 27147*606^16313-1 29369*606^16540-1 27188*606^16547-1 59284*606^16744-1 66808*606^17006-1 28109*606^17170-1 20404*606^17280-1 71995*606^17285-1 23997*606^17380-1 9144*606^17571-1 10668*606^17685-1 33164*606^17707-1 29345*606^17789-1 50544*606^17904-1 69113*606^18027-1 63254*606^18036-1 55119*606^18155-1 49015*606^18244-1 8220*606^18356-1 31180*606^18393-1 10169*606^18433-1 36054*606^18508-1 6069*606^18590-1 62672*606^18625-1 47930*606^18679-1 69610*606^18681-1 65573*606^18706-1 44259*606^18742-1 73180*606^18750-1 35288*606^18880-1 58699*606^19153-1 44913*606^19180-1 32830*606^19242-1 71618*606^19366-1 14457*606^19401-1 68644*606^19503-1 58915*606^19505-1 44702*606^19892-1 57513*606^19930-1 63142*606^19950-1 13682*606^19986-1 52153*606^20125-1 42433*606^20305-1 65998*606^20345-1 35254*606^20378-1 45098*606^20595-1 3138*606^20736-1 58240*606^20781-1 26007*606^20948-1 14865*606^21087-1 43828*606^21128-1 48472*606^21136-1 63387*606^21747-1 36425*606^21777-1 19230*606^21869-1 59717*606^22022-1 3550*606^22027-1 19489*606^22265-1 59662*606^22375-1 15835*606^22466-1 61245*606^22742-1 24007*606^23425-1 55843*606^23482-1 56529*606^23535-1 34029*606^23540-1 34960*606^23853-1 6674*606^24174-1 13439*606^24480-1 25212*606^24486-1 37398*606^24507-1 53155*606^24561-1 68987*606^24582-1 39574*606^24596-1 30230*606^24607-1 44349*606^24621-1 [/code] |
Reserving S918 to n=100k (25-100k) for BOINC
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Ian has completed S936 to n=25K; 128 primes were found for n=10K-25K shown below; 173 k's remain; base released.
[code] 42573*936^10049+1 51318*936^10072+1 21942*936^10156+1 78751*936^10183+1 9537*936^10248+1 40491*936^10257+1 5875*936^10348+1 37175*936^10470+1 26941*936^10543+1 32122*936^10594+1 72375*936^10648+1 35780*936^10717+1 47713*936^10858+1 92862*936^10965+1 4097*936^11025+1 91021*936^11052+1 50326*936^11055+1 9642*936^11077+1 57942*936^11123+1 75421*936^11157+1 92536*936^11306+1 10186*936^11332+1 13017*936^11364+1 29983*936^11409+1 80581*936^11499+1 22872*936^11587+1 31933*936^11609+1 32496*936^11661+1 64391*936^11717+1 51801*936^11749+1 21428*936^11753+1 16957*936^11761+1 58965*936^11783+1 32210*936^11795+1 32043*936^11854+1 76313*936^11887+1 36492*936^12014+1 10287*936^12074+1 43983*936^12080+1 20485*936^12085+1 59603*936^12100+1 30560*936^12285+1 86462*936^12341+1 62676*936^12384+1 97951*936^12407+1 82255*936^12421+1 26925*936^12422+1 98822*936^12438+1 97463*936^12523+1 80377*936^12549+1 72993*936^12724+1 99801*936^12924+1 79318*936^13082+1 97841*936^13228+1 29288*936^13242+1 64402*936^13531+1 4722*936^13706+1 40673*936^13892+1 85423*936^14046+1 18388*936^14169+1 73316*936^14344+1 68801*936^14376+1 4837*936^14448+1 15936*936^14679+1 66273*936^14855+1 98041*936^14891+1 44776*936^14993+1 38792*936^15052+1 63627*936^15117+1 73502*936^15148+1 33003*936^15325+1 23716*936^15401+1 46742*936^15483+1 40812*936^15739+1 26095*936^15815+1 21038*936^15852+1 87663*936^15891+1 19547*936^16092+1 25762*936^16532+1 54826*936^16540+1 100073*936^16865+1 8622*936^16915+1 28721*936^17336+1 82982*936^17337+1 72948*936^17417+1 97057*936^17443+1 49047*936^17591+1 21017*936^17609+1 79565*936^17739+1 80027*936^17795+1 70796*936^17937+1 8115*936^17983+1 94023*936^17989+1 47850*936^18574+1 59468*936^18687+1 44490*936^18706+1 17840*936^18786+1 90676*936^18889+1 82640*936^19119+1 31550*936^19140+1 84436*936^19572+1 79741*936^19695+1 74602*936^19916+1 20225*936^19956+1 4533*936^20207+1 22132*936^20239+1 31192*936^20255+1 59127*936^20605+1 3220*936^20952+1 63603*936^21326+1 40118*936^21510+1 64916*936^21562+1 79467*936^22159+1 56411*936^22305+1 27021*936^22355+1 54451*936^22381+1 78171*936^22508+1 73781*936^22930+1 32642*936^22957+1 30416*936^23254+1 95966*936^23429+1 65325*936^23477+1 86577*936^23509+1 8432*936^23621+1 42722*936^23918+1 55981*936^24012+1 70726*936^24573+1 88303*936^24807+1 [/code] This is a hell of a base. > 40% of k's were primed for n=10K-25K leaving < 175 k's remaining for a CK > 100K and a base > 900. It's now on the recommended list for n=25K-100K and sieving is in progress. :-) |
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